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US Army Corps of Engineers BUILDING STRONG®
INLAND NAVIGATION ECONOMICS WEBINAR SERIES #10 Navigation Economic System Modeling
Buddy Langdon Planning Regional Technical Specialist – Navigation
CELRH-NC / PCXIN
Huntington, WV
24 April 2013
BUILDING STRONG®
Corps Inland Navigation Mission Provide a safe, reliable, efficient, and environmentally sustainable waterborne transportation system for movement of commerce, national security needs, and recreation.
Six Step Planning Process 1 – Identify Problems & Opportunities 2 – Inventory & Forecast Critical Resources 3 – Formulate Alternative Plans 4 – Evaluate Alternative Plans 5 – Compare Alternative Plans 6 – Select Recommended Plan
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Inland Shallow Draft
Navigation Data Resources (Dick Ash)
Waterborne Traffic Demand Forecasting (Wes Walker)
Inland Navigation Economics 101 (Mark Hammond)
Transportation Rate Analysis & Externalities (Lin Prescott)
Lock Capacity & Engineering Reliability (Mark Lisney)
Navigation Component Engineering Reliability (Gabriela Lyvers)
Elasticity of Demand (Mike Hilliard)
Vessel Operating Costs - Inland (Gabe Stala)
BUILDING STRONG®
q Inland Shallow-Draft Navigation Economic Modeling Background, History, & Guidance
q Model Calculations (NIM)
q Outputs
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Outline
BUILDING STRONG®
q Founded on framework established in the 1950’s.
q First model North Central Division for the Illinois Waterway in the 1960’s.
q Simulation Models – TOWGEN / WATSIM à WATSIM IV - 1970’s.
q Inland Navigation Systems Analysis (INSA) Coordination Group within the Office of the Chief of Engineers (OCE) 1975-1976. (WAM, Flotilla, Commodity Flow, Multi-Modal)
q Transportation Systems Center of the U.S. DOT sponsored model expansion in 1977 of the Flotilla Model for user charges, called Waterway Cost Model.
q Waterway Cost Model evolved to Tow Cost Model (TCM) & Marginal Economic Analysis Model (MEA) 1979-1980 by Huntington District.
q Tow Cost / Equilibrium (TC/EQ) model mid-1980s.
q ERDC modified the Waterways Analysis Model (WAM) 1982-1999.
q ORNL TC/EQ Model à Java object oriented NIM 1996-1999, added relational database management (C++) 1999-2005, modified for Upper Ohio analysis (C#) 2006-2009, HQ Corporate certification 14 Feb 2012, modified for Bayou Sorrel alternative waterway routing equilibrium 2012.
Background : Inland Shallow-Draft Navigation Development History
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BUILDING STRONG®
q TCM/MEA & TC/EQ Models (and WAM) ü Gallipolis (1982) online Jan 1993 ü William Bacon Oliver (1986) online 1991 ü Gray’s Landing & Point Marion (1986) Monongahela River on line June 1995 / Sept 1994 ü Winfield (1986) online November 1997 ü London (1998) online July 2003 ü Marmet (Dec 1993 & May 1996) online Jan 2008 ü McAlpine (Aug 1994 & 1996) online May 2009 q Olmsted (April 1985 & Oct 1990) under construction q Markland (Aug 1999) under construction q Kentucky (1992 & 1996) under construction q Lower Monongahela (1992, 1994) under construction q Upper Tennessee Recon (1991) & Feasibility (1993) q TCM vs GEM (1986), Comparison to ESSENCE (----)
q NIM 5.1-5.2 & WAM q ORMSS-SIP (May 2006) q Greenup (April 2000 & June 2006) q Myers (April 2000) under construction q Olmsted (May 2008) under construction
Background : Inland Shallow-Draft Navigation Application History
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q NIM 5.3 & WAM q Upper Ohio Navigation Study (in review) q Calcasieu Lock (underway)
q NIM 5.4 & WAM q Bayou Sorrel Lock (underway) q Greenup Locks (underway)
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Background : Analysis Guidance
NED benefits are defined as “… increases in the net value of the national output of goods and services, expressed in monetary units …”
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Background : Analysis Guidance
Done in a system context !
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Background : Analysis Guidance
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Background : Analysis Guidance
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§ System Economic Model – spatially-detailed partial-equilibrium period-based (annual) waterway movement transportation cost & equilibration model … given a defined waterway system. Calculations include infrastructure service reliability (results are expected values)
§ Calculates & summarizes benefits & costs over a life cycle ► Benefits are a function of barge transportation demands, barge
transportation characteristics, waterway characteristics (lock capacity & reliability, taxes, towsize limits, vessel costs, etc), and shipper willingness-to-pay for barge transportation (e.g., least-cost all-overland rate)
► Costs are a function of investment costs and condition (scheduled & unscheduled / probabilistic repair costs)
§ Optimizes investments for the system ► What – component, rehab, or new construction ► When – year ► Where – by lock site
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Models / Calculations: Navigation Investment Model (NIM) Description
BUILDING STRONG®
q Incremental transportation investment changes to the waterway transportation system can be analyzed under a spatially detailed partial-equilibrium waterway transportation cost & equilibrium model framework.
q Link only traffic experiences and creates no congestion effects; traffic not moving through a lock (intra pool traffic) is inconsequential to the analysis of lock investments. Non-lock traffic flows are not modeled.
q Annual simulation of movements and av. costs & system equilibrium provides adequate cost-benefit analysis of ORS investments, assuming: a) shipments are scheduled well in advance with a carrier motive to fully employ their transportation equipment (with scheduled waterway system service disruption events scheduled 2 years in advance through Notice to Navigation process); b) insignificant seasonal variation; and c) unscheduled service disruptions are uniformly distributed throughout the year.
q All shipments of all movements are assumed to experience the same av. transit time through a constraint node. There is no seasonal variation beyond the seasonal variation endogenous to the tonnage-transit curve. In short, the model actually assumes that any seasonal variation in the tonnage-transit curve remains constant through time, tonnage level, and tonnage mix.
q Assumptions regarding the level of resolution for the waterway transportation network is user specified. Typically only one or two pick-up / drop-off nodes are assigned to each navigation pool.
q Assumptions regarding the level of resolution for movement commodity, barge type, & towboat class is user specified.
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Models / Calculations: NIM Sectorial, Spatial, & Temporal Simplifying Assumptions
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Models / Calculations: NIM Sectorial, Spatial, & Temporal Simplifying Assumptions
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Models / Calculations: NIM Sectorial, Spatial, & Temporal Simplifying Assumptions
171 ports.
56 navigation projects (ORS).
12 barge types.
8 towboat classes.
9 commodity types
16,948 unique origin-destination-commodity-barge mvts.
Link-Node Network (granularity user defined)
BUILDING STRONG®
q Technology assumptions are user defined through the traffic demand forecasts. Typically it is assumed in the forecasted demand development that technology is fixed at the time of the analysis, however, the economic and population growth rates, and environmental policies are often varied between forecast scenarios.
q Waterway forecasted demand (whether defined as inelastic or elastic) represents future waterway traffic given the endogenous technology assumptions, current water transportation cost and current land transportation cost. Since the model is calibrated to the current shipping-plans and a current waterway transportation cost is calculated from which to determine waterway transportation price change (into the future and between different system performance characteristics), the demands should be based on the current water and land transportation costs.
q Unmet waterway barge transportation demand can be assumed to be transported overland at the long-run least-costly all-overland rate. This assumption is based on the assumptions that:
q any waterway diverted traffic to the land modes would represent a insignificant increase in the land transportation tonnage; and
q land mode utilization in the future will approximate current utilization rates (i.e. land transportation capacity will grow with land transportation demand).
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Models / Calculations: NIM Barge Transportation (movement) Demand Assumptions
BUILDING STRONG®
q Waterway movement demand can be defined by the user as either fixed quantity (inelastic) or price-responsive (elastic).
q For fixed quantity (inelastic) demand movements, the willingness-to-pay for barge transportation is assumed fixed through time (unaffected by demand or land congestion). The proxy for the fixed demand willingness-to-pay is typically set as the least-costly all-overland transportation rate (noting that this value is externally derived and input to the model by the user).
q For price-responsive (elastic) demand movements, we have sufficient exogenous information to allow a unique demand curve to be calculated. The exogenous forecasted tonnage for each movement for each year corresponds to the given long-run least-costly all-overland rate, which establishes one point on each demand curve.
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Models / Calculations: NIM Barge Transportation (movement) Demand Assumptions (continued)
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q Shippers’ decisions on waterway movement volume are determined by an economic equilibrium based on an annual cost of waterway transportation and an annual cost-demand relationship (demand function) assigned to the movement. As discussed under the movement demand assumptions, this cost-demand relationship can either be defined by the user as fixed or elastic.
q When multiple scheduled closures occur in a given year at a lock, the closures are assumed to be spaced far enough apart for queues to dissipate to normal levels before the next closure occurs. The model combines the service disruption tonnage-transit curves.
q The supply of land transportation for feeder legs of the waterway routing are perfectly elastic at the given long-run base rate. Only congestion changes on the waterway leg are considered in the equilibrium process.
q Shippers have complete knowledge of annual waterway transportation prices which incorporates the cost of scheduled lock closures. Shippers do not estimate or consider expected costs for unplanned closures; they are not risk adverse and they do not have knowledge of unscheduled service disruption probability or transportation cost effects.
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Models / Calculations: NIM Equilibrium Assumptions
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q Individual shippers will not restrict waterway usage to the social optimal level, but will continue to expand waterway volumes to the level at which their average towing costs equal their marginal rate-savings (ATC = MRS). This occurs because each individual carrier pays only its own average cost for moving on the waterway system, not the true marginal costs, which include the costs imposed on all shippers.
q Each movement is considered to be continuously divisible (i.e. tonnage values are not limited to discrete barge loads or full tow configurations).
q Equilibrium in a year is independent of preceding year equilibrium (i.e. movements can change transportation mode each year). Note that scheduled and unscheduled service disruption is not independent from one year to the next and that equilibrium is a function of scheduled service disruption and that equilibrium is probabilistically adjusted (not determined) for unscheduled service disruptions.
q Unmet equilibrium waterway demand can be assumed to be transported overland at the long-run least-costly all-overland rate (note that this is not the same as traffic diverted during unscheduled service disruption).
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Models / Calculations: NIM Equilibrium Assumptions
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q Survivability of all components is assumed to the user defined analysis base year (decision point).
q Components are assumed independent and fail independently of each other. Note however, that with event-tree state change option the user can lump components into a model-level component and thus model joint components.
q Components can only fail once in a year, however, multiple reliability closures from different components are allowed to occur in a year.
q When multiple reliability closures (from different components) occur in a given year at a lock, the closures are assumed to be spaced far enough apart for queues to dissipate before the next closure occurs. The model combines the service disruption tonnage-transit curves.
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Models / Calculations: NIM Reliability Assumptions
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q Equilibrium traffic levels are determined with shipper knowledge of scheduled service disruption but without knowledge of unscheduled service disruption probabilities
q When calculating the impacts of an unscheduled service disruption event, equilibrium traffic can be diverted from the waterway because the traffic level exceeds the annual capacity of the lock with the outage, or because movements have been defined with a river closure diversion response.
q Unscheduled service disruption over capacity tonnage diversion is assumed to move at the long-run least-costly all-overland rate (and not at the river closure response diversion rate).
q Unscheduled river closure service disruption tonnage diversion is assumed to move at a user specified spot-rate.
q Except for unscheduled over capacity diversion and / or river closure response diversion, equilibrium traffic will be assumed to move on the waterway at a higher unscheduled service disruption lock transit time (as specified in the service disruption tonnage-transit curve).
q Movement river closure diversion response percentage assumed constant through time and between forecast scenario.
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Models / Calculations: NIM Unscheduled Service Disruption Assumptions
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0
10
20
30
40
50
60
0 2 4 6 8 10 12 14 16 18 20 22 24 26 28 30 32 34 36 38 40 42 44 46 48 50 52 54 56 58 60
Millions of Tons
Ave
rage
Tra
nsit
(hou
rs/to
w)
Normal Operations (both chambers open)
Service disruption e ( nn -days)
Service disruption e ( n -days)
Models / Calculations: Adjustment for Unscheduled Service Disruption
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Models / Calculations: Adjustment for Unscheduled Service Disruption
Transit Time Adj. – no traffic diversion.
0
10
20
30
40
50
60
0 2 4 6 8 10 12 14 16 18 20 22 24 26 28 30 32 34 36 38 40 42 44 46 48 50 52 54 56 58 60
Millions of Tons
Ave
rage
Tra
nsit
(hou
rs/to
w)
Normal Operations (both chambers open)
Service disruption e ( nn -days)
Service disruption e ( n -days)
Pt. A (36M Tons, 9.57 hours/tow)
Pt. B (36M Tons, 14.53 hours/tow)
Pt. C (36M Tons, 31.20 hours/tow)
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0
10
20
30
40
50
60
0 2 4 6 8 10 12 14 16 18 20 22 24 26 28 30 32 34 36 38 40 42 44 46 48 50 52 54 56 58 60
Millions of Tons
Ave
rage
Tra
nsit
(hou
rs/to
w)
Normal Operations (both chambers open)
Service disruption e ( nn -days)
Service disruption e ( n -days)
Pt. A (36M Tons, 9.57 hours/tow)
Pt. B (36M Tons, 14.53 hours/tow)
Pt. C (36M Tons, 31.20 hours/tow)
Pt. D (36M Tons, 36.16 hours/tow)
Models / Calculations: Adjustment for Unscheduled Service Disruption
Transit Time Adj. – no traffic diversion (multiple events in same year).
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0
10
20
30
40
50
60
0 2 4 6 8 10 12 14 16 18 20 22 24 26 28 30 32 34 36 38 40 42 44 46 48 50 52 54 56 58 60
Millions of Tons (annual)
Ave
rage
Tra
nsit
(hou
rs/to
w)
Normal Operations (both chambers open)
Pt. A (41M Tons, 16.2 hours/tow)
Pt. B (41M Tons, 35.37 hours/tow)
Pt. C (37.5M Tons, 50.0 hours/tow)
Service disruption e ( n -days)
Service disruption e ( nn -days)
Models / Calculations: Adjustment for Unscheduled Service Disruption
Transit Time Adj. – no traffic diversion vs. over capacity diversion.
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0
10
20
30
40
50
60
0 2 4 6 8 10 12 14 16 18 20 22 24 26 28 30 32 34 36 38 40 42 44 46 48 50 52 54 56 58 60
Millions of Tons (annual)
Ave
rage
Tra
nsit
(hou
rs/to
w) Normal Operations
(both chambers open)
Pt. A (46M Tons, 39.33 hours/tow)Pt. B (45M Tons, 31.0 hours/tow)
Pt. C (43M Tons, 21.48 hours/tow)
Models / Calculations: Adjustment for Unscheduled Service Disruption
Transit Time Adj. at adjacent project.
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1.2.4.4.5.5 Adjustment 1 – River Closure Response Traffic Adjustment
1.2.4.4.5.6 Adjustment 2 – RCR Diversion Transportation Cost Calculation
1.2.4.4.5.7 Adjustment 3 – RCR Diversion Externality Cost Calculation
1.2.4.4.5.8 Adjustment 4 – Over Capacity Traffic Adjustment
1.2.4.4.5.9 Adjustment 5 – OC Diversion Transportation Cost Calculation
1.2.4.4.5.10 Adjustment 6 – Waterway Transportation Cost Recalculation, no diversion
1.2.4.4.5.11 Adjustment 7 – Waterway Transportation Cost Recalculation, with diversion
1.2.4.4.5.12 Adjustment 8 – Expected Waterway Transportation Costs
System Equilibrium Statistics given known Average Towing Cost
EXPECTED Equilibrium Statistics
LRM Service Disruption Event probabilities
Models / Calculations: Adjustment for Unscheduled Service Disruption
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BUILDING STRONG®
Waterway Analysis
Model (WAM)
NIM Engineering Reliability Models
Traffic Demand Models & Willingness
to Pay Models
Sys. Perf. Characteristics &
Costs
WITH-PROJECT CONDITION
Models / Calculations: Navigation Investment Model (NIM) Process
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Cost-Benefit Analysis
Waterway Analysis
Model (WAM)
NIM
Engineering Reliability Models
Traffic Demand Models & Willingness
to Pay Models
Sys. Perf. Characteristics &
Costs
SYSTEM EQUILIBRIUM
Movement Data
WITHOUT-PROJECT
CONDITION
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WSDM
LRM EQ Traffic Levels
Reliability Estimates Optimization Investment
Plan
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Models / Calculations: Navigation Investment Model (NIM) Primary Modules
Reliability Data
Traffic Char. & Demands
System Characteristics
BUILDING STRONG®
While there are three primary modules, the model is much more complex. The model structure is best described and understood through the following nine separable modules:
• Water Supply and Demand Module (WSDM) • Calibration Sub-Module (Calibrate.exe) • Equilibrium Sub-Module (WSDM.exe)
• Set-Up Component Alternatives and Runs Module • Generate All Component Replacements Sub-Module (GenAllCompRep.exe) • Generate Component Replacement Curve Sets Sub-Module (GenCompReplaceCurveSet.exe) • Build Transit Time Curve Set Sub-Module (BuildTransitTimeCurveSet.exe) • Copy Run Sub-Module (CopyRun.exe)
• Lock Risk Module (LRM.exe and runLRM.exe)
• Summarize Closures Module (SummClosures.exe)
• Optimization Module (ORNIMOptim.exe)
• Build Investment Plan Module (BuildInvestmentPlan.exe)
• Build Investment Plan Closures Module (BuildInvestmentPlanClosure.exe)
• Calculate Costs Module (CalculateCosts.exe)
• Output Utility Module
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Models / Calculations: Navigation Investment Model (NIM) Primary Modules
BUILDING STRONG®
…estimates the probability of each potential closure in each year of a component’s life given equilibrium traffic levels, hazard functions and event trees.
A hazard function identifies the probability of failure of a component in a specified time period, given that it has survived up to the selected time period.
Year of FollowingAnnual Time Prob. Prob. Year Failure YearDependent Degree of Repair Repair of Closure 1/2 Spd Effect on
Component Probabilities Failure Level Level Repair Cost Days Days Reliability
Satisfactory New Gate 5% 1 $13,150,000 365 0 R=1 all future yearsTable Values 2 $3,150,000 90 0
Main - GateEvent Tree Major Major Repair 35% 1 $1,575,000 45 0 Back 5 years
100% 2 $1,575,000 45 0
Temporary Repair with 60% 1 $3,575,000 45 0 R=1 all future yearsAnnual New Gates 60% 2 $3,575,000 45 0
Unsatisfactory 3 $5,050,000 30 0Table Values
Minor0%
Scheduled Replacement Year 1 = 30 - closure days and cost $5,050,000 Year 2 = 30 - closure days and cost $5,050,000Future Reliability will be equal to 1.0 for all future years after replacement
An event tree describes the levels of failure and the associated consequences and repairs.
Lock Risk Module Simulation of the Engineering Reliability Data
Engineering Reliability (& fix consequences)
Repair Plans& Costs
Prob. Of Service Disruptions by Year
Lock Risk Module
(LRM)EXPECTED Repair Costs
Models / Calculations: Navigation Investment Model (NIM)
0%
20%
40%
60%
80%
100%
1 6 11 16 21 26 31 36 41 46
Period (Age)
Haz
ard
Func
tion
h(t)
0%
1%
2%
3%
4%
5%
6%
7%
8%
9%
10%
PUP
f(t)
Hazard Function
Probability of Unsatisfactory Performance (PUP)
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Year of FollowingAnnual Time Prob. Prob. Year Failure YearDependent Degree of Repair Repair of Closure 1/2 Spd Effect on
Component Probabilities Failure Level Level Repair Cost Days Days Reliability
Satisfactory New Gate 5% 1 $13,150,000 365 0 R=1 all future yearsTable Values 2 $3,150,000 90 0
Main - GateEvent Tree Major Major Repair 35% 1 $1,575,000 45 0 Back 5 years
100% 2 $1,575,000 45 0
Temporary Repair with 60% 1 $3,575,000 45 0 R=1 all future yearsAnnual New Gates 60% 2 $3,575,000 45 0
Unsatisfactory 3 $5,050,000 30 0Table Values
Minor0%
Scheduled Replacement Year 1 = 30 - closure days and cost $5,050,000 Year 2 = 30 - closure days and cost $5,050,000Future Reliability will be equal to 1.0 for all future years after replacement
Can now go to different PUP curve and event-tree.
PUP
Varies by yr.
Models / Calculations: Navigation Investment Model (NIM)
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Lock Risk Module Output
Models / Calculations: Navigation Investment Model (NIM)
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Age 1 2 3 … n 1 2 3 … n
1 2.00% 0.00% 5.00% … 0.10% 248$ -$ 620$ … 12$ 2 2.10% 0.00% 7.00% … 0.15% 260$ -$ 868$ … 19$ 3 2.20% 0.00% 11.00% … 0.20% 273$ -$ 1,364$ … 25$ . . . . … . . . . … .. . . . … . . . . … .. . . . … . . . . … .
50 10.00% 0.00% 67.00% … 0.90% 1,240$ -$ 8,308$ … 112$
closureID 1 = 5-day main closedclosureID 2 = not usedclosureID 3 = 15-day auxiliary chamber closedclosureID n = 30-day main chamber 1/2 speed fill / spill
Project A Component A
closureID closureID
EXPECTED Repair CostProbability of Service Disruption by Year
BUILDING STRONG®
…determines equilibrium waterway traffic levels under a given system configuration and forecast scenario for each year in the analysis period, taking into account scheduled lock closures.
Step 1 – Determine Shipping Plans WSDM calculates the towing costs and determines the cost-effective tow configurations to move the port-to-port tonnage on the waterway network honoring tow and operating characteristics.
Step 2 – Equilibrate Traffic Levels Ranks mvts by base rate savings…adds mvts and Iterates until savings are stable with no negatives.
NIM Waterway Supply & Demand Module (WSDM) Determination of Equilibrium Traffic Levels and Transportation Costs
Models / Calculations: Navigation Investment Model (NIM)
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Rehabs+ Comp Replacements
and Reactive Maintenance
Structural+ all below options
Reactive MaintenanceFix-as-Fails
Component Replacements+ Reactive Maintenance
…systematically compares investments and selects the optimal investment strategy and summarizes the results.
Least cost
INVESTMENT ANALYSIS – Example Av.Ann. Assuming Investment in Specified Year
Initial state, condition grade „A“
Stru
ctur
al c
apac
ity
Asset Age and Lifespan (in years)- varies between asset types, construction, usage -
Minimum Acceptable Level varies, depending on political, social and administrative consensus
∝
Strategy: IdealPerformance Level,best and continousmaintenance
Strategy: nomaintenance at all
20 40 80
Strategy b
Strategy c
Strategy d
Strategy a
complete rebuild,changed demands
best
wor
st
Depending onmaintenance strategy
A
C
B
Failure
Newasset
1) the recapitalization cost (if there is one); 2) the expected unsch repair costs; 3) the sch repair costs; 4) maintenance costs; and 5) expected transportation impact costs.
NIM Optimization Module Qualify & Compare Investment Options
Models / Calculations: Navigation Investment Model (NIM)
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Initial state, condition grade „A“
Stru
ctur
al c
apac
ity
Asset Age and Lifespan (in years)- varies between asset types, construction, usage -
Minimum Acceptable Level varies, depending on political, social and administrative consensus
∝
Strategy: IdealPerformance Level,best and continousmaintenance
Strategy: nomaintenance at all
20 40 80
Strategy b
Strategy c
Strategy d
Strategy a
complete rebuild,changed demands
best
wor
st
Depending onmaintenance strategy
A
C
B
Failure
Newasset
1) the recapitalization cost (if there is one); 2) the expected unscheduled repair costs; 3) the scheduled repair costs; 4) maintenance costs; and 5) expected transportation impact costs etc.
Quantify & Compare “Structural Capacity” Strategies
EP-1130-2-500 27 Dec 1996 Appendix C
Investment Plan
Models / Calculations: Navigation Investment Model (NIM)
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NIM Optimization Module Qualify & Compare Investment Options
Models / Calculations: Navigation Investment Model (NIM)
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Outputs : Navigation Investment Model (NIM)
Low Reference High Low Reference High Low Reference High Low Reference High
Benefits1,429.2$ 1,725.6$ 2,104.2$ 1,431.8$ 1,728.4$ 2,107.1$ 1,431.7$ 1,728.0$ 2,106.5$ 1,431.2$ 1,727.7$ 2,106.4$
(2.5)$ (2.5)$ (3.2)$ (1.0)$ (1.1)$ (1.2)$ (1.1)$ (1.1)$ (1.2)$ (2.0)$ (2.1)$ (2.4)$ 1,426.7$ 1,723.1$ 2,101.0$ 1,430.7$ 1,727.3$ 2,105.9$ 1,430.5$ 1,726.9$ 2,105.3$ 1,429.2$ 1,725.6$ 2,104.0$
na na na 4.0$ 4.3$ 4.9$ 3.8$ 3.9$ 4.3$ 2.5$ 2.6$ 3.1$ na na na 3.2$ 3.2$ 3.2$ 3.2$ 3.2$ 3.2$ 3.2$ 3.2$ 3.2$ na na na 1.7$ 1.7$ 1.7$ 1.7$ 1.7$ 1.7$ 1.7$ 1.7$ 1.7$ na na na -$ -$ -$ -$ -$ -$ -$ -$ -$ na na na 0.3$ 0.3$ 0.3$ 0.3$ 0.3$ 0.3$ 0.3$ 0.3$ 0.3$ na na na 9.2$ 9.4$ 10.1$ 9.0$ 9.1$ 9.5$ 7.7$ 7.8$ 8.3$
Costs **With-Project Improvement Cost -$ -$ -$ 13.3$ 13.3$ 13.3$ 17.6$ 17.6$ 17.6$ 9.9$ 9.9$ 9.9$ Scheduled Repair Cost -$ -$ -$ 1.1$ 1.1$ 1.1$ 1.1$ 1.1$ 1.1$ 1.3$ 1.3$ 1.3$ Unscheduled Repair Cost -$ -$ -$ -$ -$ -$ -$ -$ -$ -$ -$ -$ Normal O&M Cost -$ -$ -$ 0.3$ 0.3$ 0.3$ 0.3$ 0.3$ 0.3$ 0.3$ 0.3$ 0.3$
-$ -$ -$ 14.6$ 14.6$ 14.6$ 19.0$ 19.0$ 19.0$ 11.4$ 11.4$ 11.4$
na na na 14.6$ 14.6$ 14.6$ 19.0$ 19.0$ 19.0$ 11.4$ 11.4$ 11.4$
INCREMENTAL Net Benefits na na na ($5.4) ($5.2) ($4.5) ($10.0) ($10.0) ($9.5) ($3.7) ($3.6) ($3.1)
na na na 0.63 0.65 0.69 0.47 0.48 0.50 0.68 0.68 0.72
Alt. 2 Alt. 3
BAYOU SORREL LOCK ANALYSIS(Millions of dollars, Average annual 3.75% discount/amortization rate, 2016-2066 with 2016 base year)
Elastic Movement-Level Demand, NIM Selected Waterway Routings
WITH-PROJECT ALTERNATIVESWithout-Project Condition
(Alt.6 Build-In-Place Floodgate) New 75' x 1200' New 110' x 1200'Alt. 5
New 75' x 800'
Total System Costs
ITEM
Base Transportation Savings (no service disruptions) *Reduced Surplus frm Scheduled Disruptions
Incremental System BENEFITS
Incremental COSTS
Forecast Scenario Forecast Scenario Forecast Scenario Forecast Scenario
Total System Benefits
TABLE 2 - With-Projects
ALT. BENEFIT-COST RATIO (BCR)
* Includes construction impacts. Only Alt. 4 and Alt. 6 have construction / implementation impacts to transportation.** While NIM can track costs for each lock modeled in the system, only Bayou Sorrel costs have been entered.SOURCE: SUMMARY_BayouSorrel-Sys_noHR_2013-01-31.xlsx
first cost = $435.855224 first cost = $239.115657
WOPC Costs Foregone - normal O&MTOTAL Incremental BENEFITS
WOPC Costs Foregone - Unsch RepairWOPC Costs Foregone - Sch RepairWOPC Cost Foregone - Constr
Cap.= 30.968M tons Cap.= 69.054M tons Cap.= 71.568M tons Cap.= 44.589M tonsfirst cost = $75.410259 first cost = $328.050950
BUILDING STRONG® 37
Questions ?